Generalities About Sheaves - Lehrstuhl B für Mathematik
... Let {Vi } be an open covering of U ⊆ X (open). A presheaf F on X is a sheaf if for all i: s ∈ F(U ) and s|Vi = 0 then s = 0, given si ∈ F(Vi ) that match on the overlaps: si |Vi ∩Vj = sj |Vi ∩Vj there is a unique s ∈ F(U ) with s|Vi = si . Sheaves are defined by local data. ...
... Let {Vi } be an open covering of U ⊆ X (open). A presheaf F on X is a sheaf if for all i: s ∈ F(U ) and s|Vi = 0 then s = 0, given si ∈ F(Vi ) that match on the overlaps: si |Vi ∩Vj = sj |Vi ∩Vj there is a unique s ∈ F(U ) with s|Vi = si . Sheaves are defined by local data. ...
REPRESENTATIONS OF DYNAMICAL SYSTEMS ON BANACH
... Fact 1.4 suggests the following general definition. Definition 1.5. Let X be a (not necessarily metrizable) compact G-space. We say that X is tame if for every element p ∈ E(X) the function p : X → X is fragmented. The class of tame dynamical systems contains the class of HNS systems and hence also ...
... Fact 1.4 suggests the following general definition. Definition 1.5. Let X be a (not necessarily metrizable) compact G-space. We say that X is tame if for every element p ∈ E(X) the function p : X → X is fragmented. The class of tame dynamical systems contains the class of HNS systems and hence also ...
